Method of deriving a motion vector of a bi-predictive block based on a motion vector of a co-located block in a reference picture

ABSTRACT

In one embodiment the method includes selecting a list 0 motion vector of the co-located block in a first reference picture as the motion vector if the co-located block has the list 0 motion vector and a list 1 motion vector. The first reference picture is a type of reference picture permitted to be located temporally before or after the current picture. The method further includes selecting the list 1 motion vector of the co-located block in the first reference picture if the co-located block only has the list 1 motion vector, scaling the selected motion vector based on temporal distance between the current picture and the first reference picture, and deriving at least one motion vector of the bi-predictive block by applying a bit operation to the scaled motion vector.

DOMESTIC PRIORITY INFORMATION

This is a divisional of U.S. application Ser. No. 11/044,002 filed Jan. 28, 2005 now U.S. Pat. No. 7,606,307, which is a divisional of U.S. application Ser. No. 10/338,283 filed Jan. 6, 2003 and issued as U.S. Pat. No. 7,233,621; the contents of all of which are hereby incorporated by reference in their entirety.

FOREIGN PRIORITY INFORMATION

The present invention claims priority under 35 U.S.C. 119 on Korean Application No. 10-2002-0060742 filed Oct. 4, 2002, Korean Application No. 10-2002-0061243 filed Oct. 8, 2002 and Korea Application No. 10-2002-0071226, filed Nov. 15, 2002; the contents of which are hereby incorporated by reference in their entirety.

BACKGROUND OF THE INVENTION

1. Field of the Invention

The present invention relates to a moving picture coding method, and more particularly to a technique for deriving motion vectors of a B (bi-predictive) picture.

2. Description of the Related Art

A conventional B picture has five types of predictive modes such as forward mode, backward mode, bi-directional mode, direct mode and intra mode. In the forward mode, backward mode and bi-directional mode, the directions of motion vectors can be recognized from mode names because direction information are involved in the mode names. In the direct mode, two motion vectors of both directions are derived from a motion vector of a co-located block in a neighboring picture on the basis of a temporal redundancy characteristic that motion continuity is constantly maintained between two adjacent pictures. This direct mode has an advantage in terms of coding efficiency because motion information is not sent to a decoder.

On the other hand, a B picture proposed in a next-generation moving picture compression technique such as H.264 or MPEG-4 part 10 is characterized in that the B picture is allowed to be used as a reference picture because it can be stored in a reference picture buffer. This B picture is further characterized in that it has five types of predictive modes such as list 0 mode, list 1 mode, bi-predictive mode, direct mode and intra mode.

The list 0 mode is similar to the conventional forward mode, and motion information such as a reference picture index and motion vector difference are indicated respectively by ref_idx_10 and mvd_10. The list 1 mode is also similar to the conventional backward mode, and motion information such as a reference picture index and motion vector difference are indicated respectively by ref_idx_11 and mvd_11. The bi-predictive mode has two reference pictures, both of which may be located temporally before or after the B picture, or which may be located temporally before and after the B picture, respectively. In this case, two reference picture indexes and two motion vector differences are indicated respectively by ref_idx_10, ref_idx_11, mvd_10, and mvd_11, and each reference pictures has picture order count (POC) data which is temporal location information.

In the direct mode, motion vectors are obtained by selecting any one of a spatial technique and temporal technique. The spatial direct mode technique is to derive list 0 and list 1 reference picture indexes and motion vectors from neighboring blocks of a macroblock to be coded. The temporal direct mode technique is to derive a list 0 motion vector MV_(F) and list 1 motion vector MV_(B) by scaling the only motion vector, a list 0 motion vector of a co-located block in a list 1 reference picture for direct mode, which is similar to the conventional B picture. Here, the list 1 reference picture for direct mode is a P picture (hence the single motion vector) where an index for list 1 prediction is 0, and a list 0 reference picture for direct mode is a list 0 reference picture pointed by a motion vector of a co-located block in the list 1 reference picture for direct mode.

FIGS. 1(A) to 1(C) show default indexes for list 0 prediction, default indexes for list 1 prediction and list 1 reference pictures for direct mode of respective B pictures in an IBBBP pattern when the number of available list 0 and list 1 reference pictures (or the size of a short-term buffer) is 6, respectively. Here, the default indexes for list 0 prediction and the default indexes for list 1 prediction are dependant on an output order, or POC value, of a previously decoded reference picture regardless of a decoding order. In FIG. 1, all the B pictures use a temporally following P picture as the list 1 reference picture for direct mode.

FIGS. 2(A) to 2(C) show default indexes for list 0 prediction, default indexes for list 1 prediction and list 1 reference pictures for direct mode of respective B pictures in an IBBB pattern using only the B pictures, respectively. In FIG. 2(A), when a B picture to be coded is B8, a temporally preceding B5 with a list 1 index 0 is a list 1 reference picture for direct mode. As shown FIG. 2(B), a list 1 reference picture for direct mode of B7 to be subsequently decoded is the temporally following B8. Last as shown in FIG. 2(C), a list 1 reference picture for direct mode of B9 to be subsequently decoded is the temporally preceding B7.

In conclusion, as seen from FIGS. 1(A) to 2(C), a list 1 reference picture for direct mode may be a P or B picture temporally following a B picture to be coded, or a B picture temporally preceding it.

FIGS. 3(A) to 3(H) show modes that a co-located block in a list 1 reference picture for direct mode can have when the list 1 reference picture temporally follows a B picture. In this case, because the list 1 reference picture can be a P picture or B picture, the co-located block thereof has one or two motion vectors, or the intra mode. The next-generation moving picture compression technique, such as H.264 or MPEG-4 part 10, permits the reordering of reference picture indexes at a slice level, so an index 0 for list 1 prediction can be assigned to a picture just after a B picture. That is, since the list 1 reference picture can exist just after a B picture, a motion vector of the co-located block can be directed forward or backward.

FIGS. 4(A) to 4(H) show modes that a co-located block in a list 1 reference picture for direct mode can have when the list 1 reference picture temporally precedes a B picture. In this case, the co-located block has one or two motion vectors, or the intra mode, as described above. Other reference pictures can be present between the list 1 reference picture and the B picture, so a motion vector of the co-located block can point to temporally forward or backward direction.

As seen from FIGS. 3(A) to 4(H), the list 1 reference picture for direct mode can have various predictive modes, resulting in a need to explore a method for calculating direct mode motion vectors in consideration of such various cases.

SUMMARY OF THE INVENTION

The present invention relates to a method of deriving a motion vector of a bi-predictive block based on a motion vector of a co-located block in a reference picture.

In one embodiment the method includes selecting a list 0 motion vector of the co-located block in a first reference picture as the motion vector if the co-located block has the list 0 motion vector and a list 1 motion vector. The first reference picture is a type of reference picture permitted to be located temporally before or after the current picture. The method further includes selecting the list 1 motion vector of the co-located block in the first reference picture if the co-located block only has the list 1 motion vector, scaling the selected motion vector based on temporal distance between the current picture and the first reference picture, and deriving at least one motion vector of the bi-predictive block by applying a bit operation to the scaled motion vector.

BRIEF DESCRIPTION OF THE DRAWINGS

The above and other objects, features and other advantages of the present invention will be more clearly understood from the following detailed description taken in conjunction with the accompanying drawings, in which:

FIGS. 1(A) to 1(C) are views illustrating list 1 reference pictures for direct mode in a general IBBBP pattern;

FIGS. 2(A) to 2(C) are views illustrating list 1 reference pictures for direct mode in a general IBBB pattern;

FIGS. 3(A) to 3(H) are views illustrating cases where a list 1 reference picture for direct mode temporally follows a B picture (L0 MV: list 0 motion vector and L1 MV: list 1 motion vector);

FIGS. 4(A) to 4(H) are views illustrating cases where a list 1 reference picture for direct mode temporally precedes a B picture (L0 MV: list 0 motion vector and L1 MV: list 1 motion vector);

FIG. 5 is a view illustrating the motion vector prediction of a block E using motion vectors of neighboring blocks A, B and C in consideration of a general spatial redundancy;

FIGS. 6(A) to 6(C) are views illustrating cases where both a macroblock of a B picture and a co-located macroblock in a list 1 reference picture for direct mode are in a frame mode and the list 1 reference picture temporally follows the B picture;

FIGS. 7(A) to 7(D) are views illustrating cases where both a macroblock of a B picture and a co-located macroblock in a list 1 reference picture for direct mode are in a field mode and the list 1 reference picture temporally follows the B picture;

FIGS. 8(A) to 8(C) are views illustrating cases where a macroblock of a B picture is in a field mode, a co-located macroblock in a list 1 reference picture for direct mode is in a frame mode, and the list 1 reference picture temporally follows the B picture;

FIGS. 9(A) to 9(C) are views illustrating cases where a macroblock of a B picture is in a frame mode, a co-located macroblock in a list 1 reference picture for direct mode is in a field mode, and the list 1 reference picture temporally follows the B picture;

FIGS. 10(A) and 10(B) are views illustrating cases where both a macroblock of a B picture and a co-located macroblock in a list 1 reference picture for direct mode are in a frame mode and the list 1 reference picture temporally precedes the B picture;

FIGS. 11(A) to 11(D) are views illustrating cases where both a macroblock of a B picture and a co-located macroblock in a list 1 reference picture for direct mode are in a field mode and the list 1 reference picture temporally precedes the B picture;

FIGS. 12(A) and 12(B) are views illustrating cases where a macroblock of a B picture is in a field mode, a co-located macroblock in a list 1 reference picture for a general direct mode is in a frame mode, and the list 1 reference picture temporally precedes the B picture; and

FIGS. 13(A) and 13(B) are views illustrating cases where a macroblock of a B picture is in a frame mode, a co-located macroblock in a list 1 reference picture for a general direct mode is in a field mode, and the list 1 reference picture temporally precedes the B picture.

DESCRIPTION OF THE EXAMPLE EMBODIMENTS

The present invention proposes a method for deriving direct mode motion vectors when a co-located macroblock in a list 1 reference picture for direct mode is in an intra mode, and a method for acquiring the direct mode motion vectors in a case where the list 1 reference picture temporally follows a B picture and in a case where the list 1 reference picture temporally precedes the B picture.

The present invention further proposes a method for calculating the direct mode motion vectors regardless of the locations of list 0 and list 1 reference pictures for direct mode by assigning a sign to an inter-picture temporal distance value to simplify algorithms used for calculation of the direct mode motion vectors.

On the other hand, a frame mode and a field mode are switched at a picture level, so the B picture and list 1 reference picture can be coded into frame mode or field mode. As a result, a macroblock of the B picture and a co-located macroblock of the list 1 reference picture have four types of frame/field-coded combinations.

[1] Case where Co-Located Macroblock of List 1 Reference Picture is in Intra Mode

As shown in FIGS. 3(F) and 4(F), a co-located macroblock in a list 1 reference picture for direct mode can be in the intra mode regardless of a temporal location of the reference picture. Because the macroblock in this mode has no motion information, a conventional method simply sets direct mode motion vectors to 0 and defines a list 0 reference picture to be the latest decoded picture. However, the conventional method cannot guarantee a high coding efficiency. Therefore, the present invention predicts and calculates list 0 and list 1 reference pictures and motion vectors from neighboring blocks of a macroblock of a B picture to be coded, on the basis of a spatial redundancy.

A reference picture index for each list mode is acquired in the following manner. FIG. 5 is a view illustrating the motion vector prediction of a block E using motion vectors of neighboring blocks A, B and C in consideration of a general spatial redundancy.

if the neighboring blocks A, B and C have different reference picture indexes, a smallest one of the reference picture indexes is determined to be a reference picture index for the direct mode.

-   -   if two ones of the neighboring blocks have the same reference         picture index, this index is determined to be a reference         picture index for the direct mode.     -   if all the neighboring blocks have the same reference picture         index, this index is determined to be a reference picture index         for the direct mode.

Also, a motion vector for each list mode is acquired through the following motion vector prediction. At this time, if any one of the neighboring blocks A, B and C is in the intra mode, its list 0 and list 1 motion vectors are set to 0.

-   -   a motion vector having the same direction as that of a temporal         location of the above-acquired reference picture for each list         mode is selected from a neighboring block and a motion vector         for each list mode is acquired through a median operation.     -   if a neighboring block has two motion vectors with the same         directions, only one of the two motion vectors is selected in         that block and included in the median operation.

On the other hand, if neither of the effective list 0 and list 1 reference picture indexes can be derived from a neighboring block, they are set to 0 and a motion vector for each list mode is set to 0.

[2] Cases where List 1 Reference Picture for Direct Mode Temporally Follows B Picture

Case 1: Both Macroblock of B Picture and Co-Located Macroblock of List 1 Reference Picture are in Frame Mode

As seen from FIGS. 3(A) to 3(H), the co-located block in the list 1 reference picture can have one motion vector or two motion vectors. In the present invention, if the co-located block has two motion vectors, one (L0 MV or L1 MV) of the two motion vectors is selected and direct mode motion vectors are derived from the selected motion vector (this will hereinafter be described on the basis of the case where L0 MV (list 0 motion vector) is selected).

Accordingly, FIGS. 3(A) and 3(C) can be simply depicted as FIG. 6(A), FIGS. 3(B), 3(D) and 3(E) as FIG. 6(C), and FIGS. 3(G) and 3(H) as FIG. 6(B), respectively.

If the list 0 reference picture and list 1 reference picture for direct mode are located temporally before and after the B picture, respectively (FIG. 6(A)), or if both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally follows the list 1 reference picture (FIG. 6(B)), direct mode motion vectors MV_(F) and MV_(B) are calculated as follows: MV_(F)=TD_(B)×MV/TD_(D) MV_(B)=(TD_(B)−TD_(D))×MV/TD_(D)

where, TD_(B) represents a temporal distance between a current B frame and a list 0 reference frame, and TD_(D) represents a temporal distance between a list 1 reference frame and the list 0 reference frame.

Applying a bit operation to the calculation of the direct mode motion vectors MV_(F) and MV_(B) for the convenience thereof, the above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B} \times {256/{TD}_{D}}}} & {{MV}_{F} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

If both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally precedes the list 1 reference picture (FIG. 6(C)), the direct mode motion vectors MV_(F) and MV_(B) are calculated as follows: MV_(F)=−TD_(B)×MV/TD_(D) MV_(B)=−(TD_(B)+TD_(D))×MV/TD_(D)

This equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B}} \times {256/{TD}_{D}}}} & {{MV}_{F} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

Case 2: Both Macroblock of B Picture and Co-Located Macroblock of List 1 Reference Picture are in Field Mode

FIGS. 7(A) to 7(D) show cases where both the macroblock of the B picture and the co-located macroblock of the list 1 reference picture are in the field mode. Each motion vector of the macroblock of the B picture is derived from a motion vector of a co-located block in a list 1 reference field of the same parity.

If the list 0 and list 1 reference pictures for the direct mode are located temporally before and after the B picture, respectively (FIG. 7(A)), or if both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally follows the list 1 reference picture (FIG. 7(B)), direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) for each field i of a B frame (i=0 signifies a first field and i=1 signifies a second field) are calculated as follows: MV_(F,i)=TD_(B,i)×MV_(i)/TD_(D,i) MV_(B,i)=(TD_(B,i)−TD_(D,i))×MV_(i)/TD_(D,i)

where, MV_(i) represents a motion vector of a co-located block of a field i in a list 1 reference frame, TD_(B,i) represents a temporal distance between a current B field and a list 0 reference field, and TD_(D,i) represents a temporal distance between a list 1 reference field and the list 0 reference field.

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B,i} \times {256/{TD}_{D,i}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}_{i}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}_{i}} + 128} \right) ⪢ 8}} \end{matrix}$

If, because the co-located block of the field i in the list 1 reference frame has a motion vector pointing to a field in a frame temporally following the B picture, both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally precedes the list 1 reference picture (FIGS. 7(C) and 7(D)), the direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) are calculated as follows: MV_(F,i)=−TD_(B,i)×MV_(i)/TD_(D,i) MV_(B,i)=−(TD_(B,i)+TD_(D,i))×MV_(i)/TD_(D,i)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B,i}} \times {256/{TD}_{D,i}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}_{i}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}_{i}} + 128} \right) ⪢ 8}} \end{matrix}$

Case 3: Macroblock of B Picture is in Field Mode and Co-Located Macroblock of List 1 Reference Picture is in Frame Mode

FIGS. 8(A) to 8(C) show cases where the macroblock of the B picture is in the field mode and the co-located macroblock of the list 1 reference picture is in the frame mode. Here, letting the vertical coordinate of the current macroblock be y_(current) and the vertical coordinate of the co-located macroblock of the list 1 reference picture be y_(co-located), the relation of y_(co-located)=2×y_(current) is established between the two coordinates. Also, list 0 and list 1 reference fields are present in the same parities of the list 0 and list 1 reference frames, respectively.

If the list 0 and list 1 reference pictures for the direct mode are located temporally before and after the B picture, respectively (FIG. 8(A)), or if both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally follows the list 1 reference picture (FIG. 8(B)), the direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) for each field i of the B frame are calculated as follows: MV_(F,i)=TD_(B,i)×MV/TD_(D) MV_(B,i)=(TD_(B,i)−TD_(D))×MV/TD_(D)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B,i} \times {256/{TD}_{D}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {\;{{MV}_{B,i} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}}} \end{matrix}$

If, because the co-located block in the list 1 reference frame has a motion vector pointing to a frame temporally following the B picture, both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally precedes the list 1 reference picture (FIG. 8(C)), the direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) for each field i of the B frame are calculated as follows: MV_(F,i)=−TD_(B,i)×MV/TD_(D) MV_(B,i)=−(TD_(B,i)+TD_(D))×MV/TD_(D)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B,i}} \times {256/{TD}_{D}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B,i) represents a temporal distance between the current B field and the list 0 reference field, TD_(D) represents a temporal distance between the list 1 reference frame and the list 0 reference frame, and MV represents a motion vector of the co-located block in the list 1 reference frame for direct mode.

Case 4: Macroblock of B Picture is in Frame Mode and Co-Located Macroblock of List 1 Reference Picture is in Field Mode

FIGS. 9(A) to 9(C) show cases where the macroblock of the B picture is in the frame mode and the co-located macroblock of the list 1 reference picture is in the field mode. Here, letting the vertical coordinate of the current macroblock be y_(current) and the vertical coordinate of the co-located macroblock of the list 1 reference picture be y_(co-located), the relation of y_(co-located)=y_(current)/2 is established between the two coordinates. Also, because the field 0 of the list 1 reference frame is temporally closer to the B picture than the field 1 thereof, motion information of a co-located block of the field 0 is used for calculation of the direct mode motion vectors.

If the list 0 and list 1 reference pictures for the direct mode are located temporally before and after the B picture, respectively (FIG. 9(A)), or if both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally follows the list 1 reference picture (FIG. 9(B)), the direct mode list 0 and list 1 motion vectors MV_(F) and MV_(B) of the B frame are calculated as follows: MV_(F)=TD_(B)×MV₀/TD_(D,0) MV_(B)=(TD_(B)×TD_(D,0))×MV₀/TD_(D,0)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B} \times {256/{TD}_{D,0}}}} & {{MV}_{F} = {\left( {{Z \times {MV}_{0}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}_{0}} + 128} \right) ⪢ 8}} \end{matrix}$

If, because the co-located block of the field 0 of the list 1 reference frame has a motion vector pointing to a field of a frame temporally following the B picture, both the list 0 and list 1 reference pictures for the direct mode are located temporally after the B picture and the list 0 reference picture temporally precedes the list 1 reference picture (FIG. 9(C)), the direct mode list 0 and list 1 motion vectors MV_(F) and MV_(B) are calculated as follows: MV_(F)=−TD_(B)×MV₀/TD_(D,0) MV_(B)=−(TD_(B)+TD_(D,0))×MV₀/TD_(D,0)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B}} \times {256/{TD}_{D,0}}}} & {{MV}_{F} = {\left( {{Z \times {MV}_{0}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}_{0}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B) represents a temporal distance between the current B frame and the list 0 reference frame, TD_(D,0) represents a temporal distance between a field 0 of the list 1 reference frame and the list 0 reference field, and MV₀ represents a motion vector of the co-located block in the field 0 of the list 1 reference frame for direct mode.

[3] Cases where List 1 Reference Picture for Direct Mode Temporally Precedes B Picture

In this case, both the list 0 and list 1 reference pictures are located temporally before the B picture.

Case 1: Both Macroblock of B Picture and Co-Located Macroblock Of List 1 Reference Picture are in Frame Mode

As seen from FIGS. 4(A) to 4(H), the co-located block in the list 1 reference picture can have one motion vector or two motion vectors. In the present invention, if the co-located block has two motion vectors, one (L0 MV or L1 MV) of the two motion vectors is selected and direct mode motion vectors are derived from the selected motion vector (this will hereinafter be described on the basis of the case where L0 MV (list 0 motion vector) is selected).

Accordingly, FIGS. 4(A), 4(C), 4(E), 4(G) and 4(H) can be simply depicted as FIG. 10(A), and FIGS. 4(B) and 4(D) as FIG. 10(B), respectively.

If the list 0 reference picture for direct mode temporally precedes the list 1 reference picture for direct mode, direct mode motion vectors MV_(F) and MV_(B) are calculated as follows (FIG. 10(A)): MV_(F)=TD_(B)×MV/TD_(D) MV_(B)=(TD_(B)−TD_(D))×MV/TD_(D)

where, TD_(B) represents a temporal distance between a current B frame and a list 0 reference frame, TD_(D) represents a temporal distance between a list 1 reference frame and the list 0 reference frame, and MV represents a motion vector of the co-located block in the list 1 reference picture for direct mode.

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B} \times {256/{TD}_{D}}}} & {{MV}_{F} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

If the list 0 reference picture temporally follows the list 1 reference picture, the direct mode motion vectors MV_(F) and MV_(B) are calculated as follows (FIG. 10(B)): MV_(F)=−TD_(B)×MV/TD_(D) MV_(B)=−(TD_(B)+TD_(D))×MV/TD_(D)

This equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B}} \times {256/{TD}_{D}}}} & {{MV}_{F} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B) represents a temporal distance between the current B frame and the list 0 reference frame, TD_(D) represents a temporal distance between the list 1 reference frame and the list 0 reference frame, and MV represents a motion vector of the co-located block in the list 1 reference picture for direct mode.

Case 2: Both Macroblock of B Picture and Co-Located Macroblock of List 1 Reference Picture are in Field Mode

If the list 0 reference picture for direct mode temporally precedes the list 1 reference picture for direct mode, direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) for each field i of a B frame are calculated as follows (FIGS. 11(A) and 11(B)): MV_(F,i)=TD_(B,i)×MV_(i)/TD_(D,i) MV_(B,i)=(TD_(B,i)−TD_(D,i))×MV_(i)/TD_(D,i)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B,i} \times {256/{TD}_{D,i}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}_{i}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}_{i}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B,i) represents a temporal distance between a current B field and a list 0 reference field, TD_(D,i) represents a temporal distance between a list 1 reference field and the list 0 reference field, and MV_(i) represents a motion vector of a co-located block in a list 1 reference field for direct mode.

If, because the co-located block of the field i in the list 1 reference frame has a motion vector pointing to a field in a temporally following frame, the list 0 reference picture temporally precedes the list 1 reference picture, the direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) are calculated as follows (FIGS. 11(C) and 11(D)): MV_(F,i)=−TD_(B,i)×MV_(i)/TD_(D,i) MV_(B,i)=−(TD_(B,i)+TD_(D,i))×MV_(i)/TD_(D,i)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B,i}} \times {256/{TD}_{D,i}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}_{i}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}_{i}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B,i) represents a temporal distance between the current B field and the list 0 reference field, TD_(D,i) represents a temporal distance between the list 1 reference field and the list 0 reference field, and MV represents a motion vector of the co-located block in the list 1 reference field for direct mode.

Case 3: Macroblock of B Picture is in Field Mode and Co-Located Macroblock of List 1 Reference Picture is in Frame Mode

If the list 0 reference picture for direct mode temporally precedes the list 1 reference picture for direct mode, the direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) for each field i of the B frame are calculated as follows (FIG. 12(A)): MV_(F,i)=TD_(B,i)×MV/TD_(D) MV_(B,i)=(TD_(B,i)−TD_(D))×MV/TD_(D)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B,i} \times {256/{TD}_{D}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B,i) represents a temporal distance between the current B field and the list 0 reference field, TD_(D) represents a temporal distance between the list 1 reference frame and the list 0 reference frame, and MV represents a motion vector of the co-located block in the list 1 reference frame for direct mode.

If, because the co-located block in the list 1 reference frame has a motion vector pointing to a temporally following frame, the list 0 reference picture temporally follows the list 1 reference picture, the direct mode list 0 and list 1 motion vectors MV_(F,i) and MV_(B,i) for each field i of the B frame are calculated as follows (FIG. 12(B)): MV_(F,i)=−TD_(B,i)×MV/TD_(D) MV_(B,i)=−(TD_(B,i)+TD_(D))×MV/TD_(D)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B,i}} \times {256/{TD}_{D}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B,i) represents a temporal distance between the current B field and the list 0 reference field, TD_(D) represents a temporal distance between the list 1 reference frame and the list 0 reference frame, and MV represents a motion vector of the co-located block in the list 1 reference frame for direct mode.

Case 4: Macroblock of B Picture is in Frame Mode and Co-Located Macroblock of List 1 Reference Picture is in Field Mode

Because the field 1 f 1 of the list 1 reference frame is temporally closer to the B picture than the field 0 f0 thereof, motion information of a co-located block of the field 1 f 1 is used for calculation of the direct mode motion vectors.

If the list 0 reference picture for direct mode temporally precedes the list 1 reference picture for direct mode, the direct mode list 0 and list 1 motion vectors MV_(F) and MV_(B) for each field i of the B frame are calculated as follows (FIG. 13(A)): MV_(F)=TD_(B)×MV₁/TD_(D,1) MV_(B)=(TD_(B)−TD_(D,1))×MV₁/TD_(D,1)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{TD}_{B} \times {256/{TD}_{D,1}}}} & {{MV}_{F} = {\left( {{Z \times {MV}_{1}} + 128} \right) ⪢ 8}} \\ {{W = {Z - 256}}\;} & {{MV}_{B} = {\left( {{W \times {MV}_{1}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B) represents a temporal distance between the current B frame and the list 0 reference frame, TD_(D,1) represents a temporal distance between a field 1 of the list 1 reference frame and the list 0 reference field, and MV₁ represents a motion vector of the co-located block in the field 1 of the list 1 reference frame for direct mode.

If, because the co-located block of the field 1f 1 of the list 1 reference frame has a motion vector pointing to a field of a temporally following frame, the list 0 reference picture temporally follows the list 1 reference picture, the direct mode list 0 and list 1 motion vectors MV_(F) and MV_(B) are calculated as follows (FIG. 13(B)): MV_(F)=−TD_(B)×MV₁/TD_(D,1) MV_(B)=−(TD_(B)+TD_(D,1))×MV₁/TD_(D,1)

The above equation may be expressed as follows:

$\begin{matrix} {Z = {{- {TD}_{B}} \times {256/{TD}_{D,1}}}} & {{MV}_{F} = {\left( {{Z \times {MV}_{1}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}_{1}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B) represents a temporal distance between the current B frame and the list 0 reference frame, TD_(D,1) represents a temporal distance between a field 1 of the list 1 reference frame and the list 0 reference field, and MV₁ represents a motion vector of the co-located block in the field 1 of the list 1 reference frame for direct mode.

[4] Cases where Direct Mode Motion Vectors are Calculated by Assigning Sign to Inter-Picture Temporal Distance Value

In case the list 1 reference picture for direct mode is located temporally before or after the B picture, two types of algorithms are given in each case. Such algorithms can be simply expressed by assigning a sign to an inter-picture temporal distance value, as follows.

Case 1: Both Macroblock of B Picture and Co-Located Macroblock of List 1 Reference Picture are in Frame Mode

If both the macroblock of the B picture and the co-located macroblock of the list 1 reference picture are in the frame mode, the direct mode motion vectors MV_(F) and MV_(B) of the B picture can be calculated as follows:

$\begin{matrix} {{MV}_{F} = {{TD}_{B} \times {{MV}/{TD}_{D}}}} \\ {{MV}_{B} = {\left( {{TD}_{B} - {TD}_{D}} \right) \times {{MV}/{TD}_{D}}}} \end{matrix}$ or $\begin{matrix} {Z = {{TD}_{B} \times {256/{TD}_{D}}}} & {{MV}_{F} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B) represents a temporal distance between a current B frame and a list 0 reference frame, which is assigned a positive (+) sign if it is measured from the B frame and a negative (−) sign if it is measured from the list 0 reference frame, TD_(D) represents a temporal distance between a list 1 reference frame and the list 0 reference frame, which is assigned a positive (+) sign if it is measured from the list 1 reference frame and a negative (−) sign if it is measured from the list 0 reference frame, and MV represents a motion vector of the co-located block in the list 1 reference picture for direct mode.

Case 2: Both Macroblock of B Picture and Co-Located Macroblock of List 1 Reference Picture are in Field Mode

If both the macroblock of the B picture and the co-located macroblock of the list 1 reference picture are in the field mode, the direct mode motion vectors MV_(F,i) and MV_(B,i) for each field i of the B frame can be calculated as follows:

$\begin{matrix} {{MV}_{F,i} = {{TD}_{B,i} \times {{MV}_{i}/{TD}_{D,i}}}} \\ {{MV}_{B,i} = {\left( {{TD}_{B,i} - {TD}_{D,i}} \right) \times {{MV}_{i}/{TD}_{D,i}}}} \end{matrix}$ or $\begin{matrix} {Z = {{TD}_{B,i} \times {256/{TD}_{D,i}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}_{i}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}_{i}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B,i) represents a temporal distance between a current B field and a list 0 reference field, which is assigned a positive (+) sign if it is measured from the B field and a negative (−) sign if it is measured from the list 0 reference field, TD_(D,i) represents a temporal distance between a list 1 reference field and the list 0 reference field, which is assigned a positive (+) sign if it is measured from the list 1 reference field and a negative (−) sign if it is measured from the list 0 reference field, and MV_(i) represents a motion vector of a co-located block in a list 1 reference field for direct mode.

Case 3: Macroblock of B Picture is in Field Mode and Co-Located Macroblock of List 1 Reference Picture is in Frame Mode

If the macroblock of the B picture is in the field mode and the co-located macroblock of the list 1 reference picture is in the frame mode, the direct mode motion vectors MV_(F,i) and MV_(B,i) for each field i of the B frame can be calculated as follows:

$\begin{matrix} {{MV}_{F,i} = {{TD}_{B,i} \times {{MV}/{TD}_{D}}}} \\ {{MV}_{B,i} = {\left( {{TD}_{B,i} - {TD}_{D}} \right) \times {{MV}/{TD}_{D}}}} \end{matrix}$ or $\begin{matrix} {Z = {{TD}_{B,i} \times {256/{TD}_{D}}}} & {{MV}_{F,i} = {\left( {{Z \times {MV}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B,i} = {\left( {{W \times {MV}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B,i) represents a temporal distance between the current B field and the list 0 reference field, which is assigned a positive (+) sign if it is measured from the B field and a negative (−) sign if it is measured from the list 0 reference field, TD_(D) represents a temporal distance between the list 1 reference frame and the list 0 reference frame, which is assigned a positive (+) sign if it is measured from the list 1 reference frame and a negative (−) sign if it is measured from the list 0 reference frame, and MV represents a motion vector of the co-located block in the list 1 reference frame for direct mode.

Case 4: Macroblock of B Picture is in Frame Mode and Co-Located Macroblock of List 1 Reference Picture is in Field Mode

If the macroblock of the B picture is in the frame mode, the co-located macroblock of the list 1 reference picture is in the field mode and the list 1 reference picture temporally follows the B picture, the field 0 of the list 1 reference frame is temporally closer to the B picture than the field 1 thereof, so motion information of a co-located block of the field 0 is used for calculation of the direct mode motion vectors. As a result the direct mode motion vectors MV_(F) and MV_(B) of the B frame can be obtained from the below equation where the motion information of the co-located block in the field 0 of the list 1 reference frame is used for calculation of the direct mode motion vectors:

$\begin{matrix} {{MV}_{F} = {{TD}_{B} \times {{MV}_{0}/{TD}_{D,0}}}} \\ {{MV}_{B} = {\left( {{TD}_{B} - {TD}_{D,0}} \right) \times {{MV}_{0}/{TD}_{D,0}}}} \end{matrix}$ or $\begin{matrix} {Z = {{TD}_{B} \times {256/{TD}_{D,0}}}} & {{MV}_{F} = {\left( {{Z \times {MV}_{0}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}_{0}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B) represents a temporal distance between the current B frame and the list 0 reference frame, which is assigned a positive (+) sign if it is measured from the B frame and a negative (−) sign if it is measured from the list 0 reference frame, TD_(D,0) represents a temporal distance between a field 0 of the list 1 reference frame and the list 0 reference field, which is assigned a positive (+) sign if it is measured from the field 0 of the list 1 reference frame and a negative (−) sign if it is measured from the list 0 reference field, and MV₀ represents a motion vector of the co-located block in the field 0 of the list 1 reference frame for direct mode.

If the list 1 reference picture temporally precedes the B picture, the field 1 of the list 1 reference frame is temporally closer to the B picture than the field 0 thereof, so motion information of a co-located block of the field 1 is used for calculation of the direct mode motion vectors. As a result the direct mode motion vectors MV_(F) and MV_(B) of the B frame can be obtained from the below equation where the motion information of the co-located block in the field 1 of the list 1 reference frame is used for calculation of the direct mode motion vectors:

$\begin{matrix} {{MV}_{F} = {{TD}_{B} \times {{MV}_{1}/{TD}_{D,1}}}} \\ {{MV}_{B} = {\left( {{TD}_{B} - {TD}_{D,1}} \right) \times {{MV}_{1}/{TD}_{D,1}}}} \end{matrix}$ or $\begin{matrix} {Z = {{TD}_{B} \times {256/{TD}_{D,1}}}} & {{MV}_{F} = {\left( {{Z \times {MV}_{1}} + 128} \right) ⪢ 8}} \\ {W = {Z - 256}} & {{MV}_{B} = {\left( {{W \times {MV}_{1}} + 128} \right) ⪢ 8}} \end{matrix}$

where, TD_(B) represents a temporal distance between the current B frame and the list 0 reference frame, which is assigned a positive (+) sign if it is measured from the B frame and a negative (−) sign if it is measured from the list 0 reference frame, TD_(D,1) represents a temporal distance between a field 1 of the list 1 reference frame and the list 0 reference field, which is assigned a positive (+) sign if it is measured from the field 1 of the list 1 reference frame and a negative (−) sign if it is measured from the list 0 reference field, and MV₁ represents a motion vector of the co-located block in the field 1 of the list 1 reference frame for direct mode.

As apparent from the above description, the present invention provides a method for calculating direct mode motion vectors of a B (Bi-predictive) picture defined in a next-generation moving picture compression technique. A technique for extracting the direct mode motion vectors of the B picture is proposed to raise the probability that a direct mode will be selected as a predictive mode of a macroblock, thereby improving a B picture coding efficiency.

As further described with respect to the above embodiments, a method for determining motion vectors of a B (Bi-predictive) picture includes, if a co-located block in a list 1 reference picture for direct mode has two motion vectors, selecting one (a list 0 motion vector or list 1 motion vector) of the two motion vectors, and deriving the direct mode motion vectors of the B picture from the selected motion vector.

The one of the list 0 and list 1 motion vectors, which points to a picture temporally closer to the list 1 reference picture for direct mode, may be selected as the motion vector for derivation of the direct mode motion vectors, or the list 0 motion vector may be selected as the motion vector for derivation of the direct mode motion vectors if the two motion vectors point to the same reference picture. The direct mode motion vectors may then be derived as discussed in detail above using the selected motion vector.

However, instead of selecting between the list 1 and list 0 motion vectors of the co-located block, the list 0 motion vector may be unconditionally selected as the motion vector for derivation of the direct mode motion vectors. Namely, if both the list 0 and list 1 motion vectors of the co-located block exist, the list 0 motion vector is selected as the motion vector for derivation of the direct mode motion vectors. Accordingly, in this embodiment the list 0 motion vector is selected regardless of whether a list 1 motion vector is present. Stated another way, the list 0 motion vector is selected regardless of the prediction modes of the co-located block. The direct mode motion vectors may then be derived as discussed in detail above using the selected motion vector.

Also, according to another embodiment one of the motion vectors of the co-located block in the list 1 reference picture for direct mode may be selected as the motion vector for derivation of the direct mode motion vectors regardless of modes (a list 0 mode and/or a list 1 mode) of the motion vectors of the co-located block. The direct mode motion vectors may then be derived as discussed in detail above using the selected motion vector.

In a further alternative embodiment if a co-located block in a list 1 reference picture for direct mode has only a list 1 motion vector, the list 1 motion vector of the co-located block is selected and used as the motion vector for derivation of the direct mode motion vectors. The direct mode motion vectors may then be derived as discussed in detail above using the selected motion vector.

The embodiments of the present invention may further include determining the list 0 reference picture for direct mode as a reference picture referenced by the co-located block. The co-located block may include reference information referencing a reference picture. For example, the selected motion vector may point to a reference picture, and this reference picture may be selected as the list 0 reference picture for direct mode.

Alternatively, a decoded picture located temporally just before the B picture may be determined as the list 0 reference picture for direct mode.

Although example embodiments of the present invention have been disclosed for illustrative purposes, those skilled in the art will appreciate that various modifications, additions and substitutions are possible, without departing from the scope and spirit of the invention. 

1. A method of deriving at least one motion vector of a bi-predictive block in a current picture from a motion vector of a co-located block in a first reference picture, performed by a moving picture coding system, comprising: selecting, by the moving picture coding system, a list 0 motion vector of the co-located block in a first reference picture as the motion vector for deriving the at least one motion vector of the bi-predictive block regardless of whether the co-located block has a list 1 motion vector if the co-located block has the list 0 motion vector, the first reference picture being a type of reference picture permitted to be located temporally before or after the current picture; selecting, by the moving picture coding system, the list 1 motion vector of the co-located block in the first reference picture if the co-located block only has the list 1 motion vector; scaling, by the moving picture coding system, the selected motion vector based on temporal distance between the current picture and a second reference picture which is referred by the co-located block in the first reference picture; and deriving, by the moving picture coding system, the at least one motion vector of the bi-predictive block by applying a bit operation to the scaled motion vector. 